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If f:RR-> RR is a differentiable funct...

If ` f:RR-> RR ` is a differentiable function such that `f(x) > 2f(x) ` for all `x in RR ` and `f(0)=1, ` then

A

`f(x)gte^(2x)in (0,oo)`

B

f(X) is decreasing in `(0,oo)`

C

f(X) is increasing in `(0,oo)`

D

`f'(x)lte^(2x)`in `(0,oo)`

Text Solution

Verified by Experts

The correct Answer is:
1,3
Give that `f(x)gt2f(x)forall x in R`
`rarr f(x)-2f(x)gt0 forall x in R`
`therefore e^(-2x)f(x)-2f(x)gt0 forall x in R`
`rarr (d)/(dx)(e^(-2x)f(x))gt0 forall x in R`
Let g(x)=`e^(-2x)f(x)`
Now `g(X) gt 0 forall x in R`
Also g(0)=1
`rarr g(X)gt(0)=1`
`rarr f(x)gte^(2x)forall x in (0,oo)`
So option 1 is correct
f(X) is strictly increasing on x in `(0,oo)`
so option 3 is correct
Clearly option 4 is incorrect
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